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<h3 style="text-align: center;">Ed Bueler's Reviews for <span style="font-style: italic;">Mathematical

Reviews</span></h3>

<div style="text-align: center;"><span style="font-style: italic;"><span style="font-style: italic;">(listed

alphabetically)<br>

<br>

</span></span></div>

<br>

<ul>

<li>van den Berg, M. and Gilkey, P., <i>Heat content asymptotics

with inhomogeneous Neumann and Dirichlet boundary conditions, </i>Potential

Anal.

14 (2001), no. 3, 269--274</li>

<li> Carron, G., Exner, P., and Krejcirik, D., <span style="font-style: italic;">Topologically

nontrivial quantum layers</span>,&nbsp;

J. Math. Phys. <span style="font-weight: bold;">45</span> (2004), no.

2, 774--784</li>

<li> Chen, Roger, <i>On global Schrödinger kernel estimate

and eigenvalue problem</i>,&nbsp; Math. Z. <b>227</b> (1998), no. 1,

69--81<span style="text-decoration: underline;"></span></li>

<li> Craig, Walter, <i>On the microlocal regularity of the

Schrödinger kernel</i>. Partial differential equations and their

applications (Toronto, ON, 1995), 71--90, CRM Proc. Lecture Notes, <b>12</b>,

Amer. Math. Soc., Providence, RI, 1997</li>

<li> Dodziuk, Jozef, and Mathai, Varghese, <i>Approximating L^2

invariants of amenable covering spaces: a heat kernel approach</i>.

Lipa's legacy (New York, 1995), 151--167, Contemp. Math., <b>211</b>,

Amer. Math. Soc., Providence, RI, 1997</li>

<li> Gilkey, Peter, <i>Heat content asymptotics</i>. Geometric

aspects of partial differential equations (Roskilde, 1998), 125--133,

Contemp. Math., <b>242</b>, Amer. Math. Soc., Providence, RI, 1999</li>

<li> Gong, Fu-Zhou and Wang, Feng-Yu, <i>Heat kernel estimates

with application to compactness of manifolds, </i>Q. J. Math. <b>52</b>

(2001), no. 2, 171--180</li>

<li>Grigoryan, Alexander and Saloff-Coste, Laurent, <i>Dirichlet

heat kernel in the exterior of a compact se</i>t, Comm. Pure Appl.

Math. <b>55</b> (2002), no. 1, 93--133<br>

</li>

<li>Krejcirik, David, <i>Quantum strips on surfaces</i>, J. Geom.

Phys. <b>45</b> (2003), no. 1-2, 203--217<br>

</li>

<li>Polterovich, Iosif, <i>A commutator method for computation of

heat invariants</i>, Indag. Math. (N.S.) <b>11</b> (2000), no. 1,

139--149<br>

</li>

<li> Prokhorenkov, Igor, <i>Morse-Bott functions and the Witten

Laplacian</i> .&nbsp; Comm. Anal. Geom.<b> 7 </b>(1999), no. 4,

841--918</li>

<li> Shubin, Mikhail, <i>Classical and quantum completeness for

the Schrödinger operators on non-compact manifolds.</i>&nbsp;

Geometric aspects of partial differential equations (Roskilde, 1998),

257--269, Contemp. Math., <b>242</b>, Amer. Math. Soc., Providence,

RI, 1999</li>

<li>Vesentini, Edoardo, <span style="font-style: italic;">Heat

conservation on Riemannian manifolds</span>.&nbsp; Ann. Mat. Pura

Appl.

(4) <span style="font-weight: bold;">182</span> (2003), no. 1,

1&#8211;19</li>

<li> Yu, Yanlin, <i>A semi-classical limit and its applications</i>.

Geometry and topology of submanifolds, <b>X</b> (Beijing/Berlin,</li>

1999), 315--335, World Sci. Publishing, River Edge, NJ, 2000

</ul>

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